61. People Harvard Mathematics Department Mathematics Harvard Logo. News. People. Info. Search. Local.Links. Sculpture of oscar zariski in the Science Center. http://www.math.harvard.edu/people.html

Sculpture of Oscar Zariski in the Science Center. Alphabetic directory Office floorplans (TeX) (Dvi) ... (Pdf) Visitors/Postdocs for the semester D. Avritzer (V) P. Bamberg (V) K. Chung (V) M. Ciperjani (V) P. Colmez (V) Y. Dong (V) W. Gan (V) G. Heier (V) M. Hopkins (V) B. Howard (PD) C. Liu (PD) C. Liu (V) M. Mustata (V) M. Nowak (V) J. Propp (V) O. Sanchez-Valenzuela (V) R. Sharifi (PD) C. Skinner (V) Y. Su (V) P. Trapa (PD) J. Wang (V) S. Wu (V) J. Young (PD) M. Zompatori (V) Gradstudents A. Alvine M. Bainbridge S. Cautis J. Chen J. Chen H. Cheng T. Chmutova P. Clark I. Coskun E. Cotterill B. Cui S. Dean D. Drescher D. Dumas P. Green G. Grigorov F. Herzig S. Jain D. Jao J. Kaplan S. Karigiannis D. Khosla N. Kim A. Kumar E. Lee Y. Liu A. Lobb M. Lucianovic C. Manolescu A. Marian J. Mast E. Matsen M. Mirzakhani V. Mohta R. Neel A. Neitzke K. Paur A. Pekker O. Plamenevskaya A. Popa N. Ramsey J. Rasmussen D. Rauch N. Rogers M. Schein R. Scott R. Sena-Dias S. Shin J. Song R. Stokes M. Weissman C. Wu S. Yang T. Yoshida J. Yu Staff R. Aguirre S. Alpert A. Gaer L. Kennedy S. Milano

62. Definition And Examples Of Topologies a topology on X by A if X A is finite or A = . This is called the cofinite or zariskitopology after the Belarussian mathematician oscar zariski (1899 to 1986 http://www.gap-system.org/~john/MT3822/Lectures/L11.html

Metric and Topological Spaces Previous page (Topological Motivation) Contents Next page (Properties of topological spaces) Definition and examples of topologies We now build on the idea of "open sets" introduced earlier. Definition Let X be a set. A set of subsets of X is called a topology (and the elements of are called open sets ) if the following properties are satisfied. (the empty set), X A i i I then A i if A B then A B Remarks Conditions 2. and 3. can be summarised as: The topology is closed under arbitrary unions and finite intersections. (X, ) is called a topological space Examples The prototype Let X be any metric space and take to be the set of open sets as defined earlier. The properties verified earlier show that is a topology. Some "extremal" examples Take any set X and let is a topology called the trivial topology or indiscrete topology Let X be any set and let be the set of all subsets of X . The is a topology called the discrete topology . It is the topology associated with the discrete metric. Remark A topology with many open sets is called strong ; one with few open sets is weak The discrete topology is the strongest topology on a set, while the trivial topology is the weakest.

63. BWBCAT VIDEO 064 SEE LIBRARIAN. oscar zariski and his work. Mumford, D. (David); zariski, O. (oscar) American Mathematical Society (AMS). http://library.ictp.trieste.it/VWEB/vweb.html

list of videos videos can be seen only in the library upon reservation title/author shelf A whisper from space. Jones, P. (Peter) ; Moore, R. (Ray) British Broadcasting Corporation (BBC). London, BBC, 1978. VIDEO 001 SEE LIBRARIAN The other way. Mansfield, J.M. (John M.) ; Holm, I. (Ian) British Broadcasting Corporation (BBC). London, BBC, 1974. VIDEO 002 SEE LIBRARIAN The message in the rocks. Nisbett, A. (Alec) ; Vaughan, P. (Paul) British Broadcasting Corporation (BBC). London, BBC, 1978. VIDEO 003 SEE LIBRARIAN Mars alive. Ceresole, P. (Peter) ; Pigott-Smith, T. (Tim) British Broadcasting Corporation (BBC). London, BBC, 1993. VIDEO 004 SEE LIBRARIAN 10,000 year test. Rowe, J. (John) British Broadcasting Corporation (BBC). London, BBC, 1990. VIDEO 005 SEE LIBRARIAN Prof. Hawking's universe. Jarvis, M. (Martin) British Broadcasting Corporation (BBC). London, BBC, 1983. VIDEO 006 SEE LIBRARIAN The amazing Dr. Newton. Newton, I. (Isaac) British Broadcasting Corporation (BBC). London, BBC, 1977. VIDEO 007 SEE LIBRARIAN The black holes of gravity.

64. Untitled zariski, oscar MA 140. Algebraic Surfaces /oscar zariski. - 2. Auflaage. Berlin; Heidelberg Springer, 1971. -. http://www.gwdg.de/gwdg/standort/bibliothek/autuz5.htm

[Top] [Prev] [Next] [Bottom] Zaanen, Adriaan Cornelis MA 101 Linear Analysis / Adriaan Cornelis Zaanen. - Amsterdam: North-Holland Publishing Company, 1964. - (Bibliotheca Mathematics - A Series of Monographs on pure and applied Mathematics ; Volume II) Zaanen, Adriaan Cornelis MA 102 Integration / Adriaan Cornelis Zaanen. - 2. Auflage Amsterdam: North Holland Publishing Company, 1967. - Zabolitzky, John G. EC 71 Computer Simulation and Computer Algebra Lectures for Beginners / Dietrich Stauffer; Hehl, Friedrich W.; Winkelmann, Volker; Zabolitzky, John G. - Berlin; Heidelberg; New York: Springer, 1988. - Zachert, P. RA 105 Zadeh, Lotfi A. XA 521 Uncertainty in Knowledge Bases / Bernadette Bouchon-Meunier; Yager, Ronald R.; Zadeh, Lotfi A. [Hrsg.]. - Berlin; Heidelberg; New York: Springer, 1991. - (Lecture Notes in Computer Science ; Vol. 521) Zadeh, Lotfi A. XA 945 Advances in Intelligent Computing - IPMU'94 / Bernadette Bouchon-Meunier; Yager, Ronals R.; Zadeh, Lotfi A. [Hrsg.]. -

65. Volume 2 Part II Section 3 On a Question of oscar zariski, Joseph Blass, Piotr Blass, andJeff Lang Open Questions Piotr Blass and Timothy J. Ford Volume 2, Issue 2 http://www.ulam.usm.edu/ulam_previous.html

Volume 3, Issue 1 Contents SPGC is true if it holds for all doubly short chord graphs, Zbigniew Lonc and Leszek S. Zaremba A Relation between Complexity and Entropy, ... Piotr Blass and Stan Klasa Volume 2, Issue 4 Contents On the Stochastic Adaptive Control of an Investment Model with Transaction Fees T. Duncan, M. Faul, B. Pasik-Duncan, and O. Zane A Generalization of the Littlewood-Paley Inequality and Some Other Results Related to Stochastic Partial Differential Equations ... Omar Zane Volume 2, Issue 3 Contents Galois Groups for Polynomials Related to Quadratic Map Iterates, W. A. Beyer and J. D. Louck A Variety Associated to a Portfolio, ... Piotr Blass and Timothy J. Ford Volume 2, Issue 2 Contents Free Products of Matrices Roger C. Alperin On the Polynomial Representation of Certain Recurrences, ... Joseph Blass, Piotr Blass, and Stan Klasa Volume 2, Issue 1 Contents On the Extrema of the Expected Values of Functions of Independent Identically Distributed Random Variables, Some Questions on Unique Factorization, Piotr Blass, Joseph Blass, and Jeffrey Lang ... Blass, and Joseph Kolibal Volume 1, Issue 4 Contents Theorem About a Uniqueness Criterion for a Solution of an Abstract Nonlocal Cauchy Problem,

66. P7 Quirós, Universidad Autónoma de Madrid, Spain (Eds.). Resolutionof Singularities A Research Textbook in Tribute to oscar zariski. http://www.yurinsha.com/321/p7.htm

R.P. Bambah V.C. Dumir R.J. Hans Gill, (Eds.) all of Panjab University, Chandigarh, India Number Theory 3-7643-6259-6 * 2000 * Hardcover * 536 pages This book contains 23 papers on various branches of number theory contributed by leading mathematicians, giving an overview of the developments in their respective fields together with open problems. These will be of interest to mathematicians at various levels providing the reader with ready access to meaningful problems and results, which have attracted the attention of some leading number theorists. Series : Trends in Mathematics Contents Preface A Centennial History of the Prime Number Theorem T.M. Apostol Non-Homogeneous Problems: Conjectures of Minkowski and Watson On the Oscillation Theorems of Pringsheim and Landau Modular Equations in Ramanujan's Lost Notebook B.C. Berndt The abc-Conjecture J. Browkin On Values of Linear and Quadratic Forms at Integral Points S.G. Dani Variants of the Second Borel-Cantelli Lemma and their Applications in Metric Number Theory G. Harman

67. 13: Commutative Rings And Algebras 182pp. zariski, oscar; Samuel, Pierre Commutative algebra Graduate Texts inMathematics, Vol. 29. SpringerVerlag, New York-Heidelberg, 1975. 414 pp. http://www.math.niu.edu/~rusin/known-math/index/13-XX.html

Search Subject Index MathMap Tour ... Help! ABOUT: Introduction History Related areas Subfields POINTERS: Texts Software Web links Selected topics here 13: Commutative rings and algebras Introduction Commutative rings and algebras are sets like the set of integers, allowing addition and (commutative) multiplication. Of particular interest are several classes of rings of interest in number theory, field theory, algebraic geometry, and related areas; however, other classes of rings arise, and a rich structure theory arises to analyze commutative rings in general, using the concepts of ideals, localizations, and homological algebra. A commutative ring is a set endowed with two binary operations "+" and "*" subject to familiar associative, commutative, and distributive laws. (It is usually but not universally assumed that the rings contain an identity element "1" for multiplication.) Examples include the rings of integers in algebraic number fields; here, the interest is number-theoretic: common questions concern factorization and the class group, the action of the Galois group, and the structure of the group of units. A commutative algebra is a commutative ring which contains a field (usually as a subring over which the entire ring is finitely-generated). Examples include coordinate rings of algebraic varieties, that is, quotients of polynomial rings over a field; here, the interest is geometric: how are the local rings different at singular points, and how do subvarieties intersect? In some sense the theory of commutative rings and algebras can be seen as the search for common features of these two classes of examples, and the effort to explain features of a general commutative ring as being like these two types. We can clarify these fields of inquiry by reviewing the subfields of section 13.

68. The MacTutor History Of Mathematics Archive Remak, 18881942 Adolf Fraenkel, 1891-1965 Emil Artin, 1898-1962 Helmut Hasse, 1998-1979Wolfgang Krull, 1899-1971 oscar zariski, 1899-1986 Richard Brauer, 1901 http://www.math.niu.edu/~beachy/rings_modules/notes/names.html

These links will take you to pages at The MacTutor History of Mathematics archive Carl Friedrich Gauss, 1777-1855 Carl Jacobi, 1804-1851 Lejeune Dirichlet, 1805-1859 ... Maurice Auslander, 1926-1994 These above links lead to pages at The MacTutor History of Mathematics archive

69. Compute is about? Abhyankar The story starts with my PhD thesis, completedin 1955 under the direction of oscar zariski. zariski, in the http://www.math.missouri.edu/~news/issue4/conjecture.html

Cutkosky Solves Abhyankar Conjecture Dale Cutkosky has given the solution in characteristic zero of the 40-year-old Abhyankar Conjecture concerning the factorization of birational maps. Mathematicians have considered the conjecture one of the most difficult problems in math. Little progress was made toward a solution in 20 years. Shreeram S. Abhyankar is the Marshall Distinguished Professor of Mathematics at Purdue University and recipient of the Chauvenet Prize of the Mathematical Association of America. He posed the Abhyankar Conjecture in 1966 and restated it in his book Algebraic Geometry for Scientists and Engineers, Volume AMS Surveys and Monographs printed in 1990. Critical Points tracked down Abhyankar in London to get his reaction to the solution of his famous conjecture: C.P.: Can you tell our readers, in a non-technical way, what the Abhyankar conjecture is about? Abhyankar: C.P.: What was the status of the conjecture when Dale Cutkosky solved it? Abhyankar: I gave this problem to my various PhD students, and in 1972 one of my students named Shannon showed that exactly in the original form of Zariski, it is not true in dimension 3. I then raised the question that if one cannot do such a precise factorization, a weaker factorization ought to be true. Then a piece of this was done by another of my PhD students, Christensen, around 1979. After that, the problem remained open for many years until Dale worked on it and made this tremendous progress.

70. EL MEJOR ESTUDIANTE Translate this page en temas de geometría algebraica, concretamente en el tema de correspondenciasalgebraicas que generaliza la memoria de oscar zariski sobre correspondencias http://www.dma.fi.upm.es/mabellanas/pa/Sols.htm

El Mejor Estudiante por Ignacio Sols Lucia Dpto. de Algebra, Univ. Complutense de Madrid e-mail: sols@mat.ucm.es En estos años, hacia finales de los setenta, yo mismo pude tener una experiencia de primera mano de la actitud de Abellanas hacia sus discípulos. Al llegar a Madrid para trabajar con él, D. Pedro Abellanas, que estaba al tanto de los aires de vuelta a la geometría clásica, y de que en París iba a impartir Arnaud Beauville un curso sobre la clasificación de Enriques de las superficies algebraicas, me pidió que fuera allí "como espía" porque había que importar esas técnicas. Al joven espíritu de aquel anciano le debo, pues, el principio de una trayectoria que luego ha conformado mi orientación en geometría, y la de algunos estudiantes míos. D. Pedro Abellanas se jubiló en 1984. Cercano ya a la jubilación, le oía decir con frecuencia: "después de tantos años, no me otorgo aún el título de matemático, pero sí el título de estudiante de matemáticas". Entonces me dolía, me parecía injusto. Ahora, algo más maduro, he comprendido. Honor, pues, al buen estudiante.

71. MathComp Database - Short View Of Documents 3, 1054315, 1951, zariski, oscar, 18991986 THEORY AND APPLICATIONS OFHOLOMORPHIC FUNCTIONS ON ALGEBRAIC VARIETIES OVER ARBITRARY GROUND FIELDS. http://ram0.huji.ac.il/ALEPH/ENG/JSL/JMC/JMC/FIND-ACC/0169491

MathComp database - Short view of 519 documents To display full information of a single document, click on the eye. to mail the retrieved set in brief format to your e-mail account. 0 SERIES 1-, 1950- MEMOIRS OF THE AMERICAN MATHEMATICAL SOCIETY DIEUDONNE, JEAN ALEXANDRE, ... ON THE AUTOMORPHISMS OF THE CLASSICAL GROUPS ZARISKI, OSCAR, 1899-1986 ... THEORY AND APPLICATIONS OF HOLOMORPHIC FUNCTIONS ON ALGEBRAIC VARIETIES OVER ARBITRARY GROUND FIELDS STRODT, WALTER CHARLES, ... CONTRIBUTIONS TO THE ASYMPTOTIC THEORY OF ORDINARY DIFFERENTIAL EQUATIONS IN THE COMPLEX DOMAIN HIRSCHMAN, I. I. (ISIDORE ... THE DECOMPOSITION OF WALSH AND FOURIER SERIES GROTHENDIECK, A. (ALEXANDRE) ... PRODUITS TENSORIELS TOPOLOGIQUES ET ASPACES NUCLEAIRES HIJIKATA, HIROAKI, 1936- ... THE BASIS PROBLEM FOR MODULAR FORMS ON [GAMMA]O(N) DICKSON, DOUGLAS G. EXPANSIONS IN SERIES OF SOLUTIONS OF LINEAR DIFFERENCE-DIFFERENTIAL AND INFINITE ORDER DIFFERENTIAL EQUATIONS WITH CONSTANT COEFFICIENTS SNAPPER, ERNST, 1913- ... COHOMOLOGY GROUPS AND GENERA OF HIGHER-DIMENSIONAL FIELDS BELLMAN, RICHARD ERNEST, ...

72. BULL - Volume 37, Number 1 37 (2000), 9394. Review information Retrieve review in PDF DVI TeX PostScriptAlgebraic surfaces by oscar zariski Reviewer Solomon Lefschetz Bull. Amer. http://www.num.math.uni-goettingen.de/trapp/bull-index.html

ISSN 1088-9485 (e) ISSN 0273-0979 (p) Journals home Search journals For Authors Subscribe ... All issues Contents of Volume 37, Number 1 Introductory comments Donald G. Saari Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Mathematical progress in America President Thomas S. Fiske Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript The history of mathematics in the nineteenth century Professor James Pierpont Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript The present and the future of mathematical physics Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Elementary derivation of the equivalence of mass and energy Albert Einstein Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Current tendencies of mathematical research Edward B. Van Vleck

73. Profiles Of Women In Mathematics: F. Jessie MacWilliams In 1939, she received a traveling scholarship from Cambridge and wentto Johns Hopkins University, where she studied with oscar zariski. http://www.awm-math.org/noetherbrochure/MacWilliams80.html

F. Jessie MacWilliams A Survey of Coding Theory San Antonio, Texas 1980 Previous Index Next FLORENCE JESSIE COLLINSON MACWILLIAMS was born in 1917 in Stoke-on-Trent, England. She received her BA in 1938 and her MA the following year, both from Cambridge University. In 1939, she received a traveling scholarship from Cambridge and went to Johns Hopkins University, where she studied with Oscar Zariski. In 1940, she followed Zariski to Harvard University to study there for a year. She married in 1941 and left her mathematical work for some years to raise her three children, one daughter and two sons. In 1958, MacWilliams went to work as a computer programmer at Bell Telephone Laboratories in Murray Hill, New Jersey, where her husband; Walter MacWilliams, had been hired as an engineer after the war. She became interested in coding theory when R. C. Bose came to Bell Labs and gave a talk on the subject. MacWilliams wanted to become a member of the Bell Labs technical staff, a position requiring a PhD, so in 1961, she returned to Harvard for a year and obtained a PhD, studying coding theory with Andrew Gleason. (Her daughter Ann, who also has a PhD in mathematics, was studying at Harvard at the same time.) According to an obituary which was written by Vera Pless of the University of Illinois at Chicago and which appeared in SIAM News in November 1990, MacWilliams' PhD thesis, "Combinatorial Problems of Elementary Group Theory", contains "one of the most powerful theorems in coding theory."

74. Faculty/Student Interests Much of my research has focused on the study of the geometry of zariski Surfacesand certain questions concerning them posed by oscar zariski. http://www.math.ukans.edu/caag/faculty.html

Faculty Interests Craig Huneke Professor email: huneke@math.ukans.edu URL: www.math.ukans.edu/~huneke Back to Main page Dan Katz Professor email: dlk@math.ukans.edu Among my current interests are the homological conjectures in mixed characteristic, in particular, the question of whether or not cycles are integral over boundaries in certain classes of complexes consisting of finitely generated free modules. I'm also interested in Rees algebras and integral closures of ideals and modules. Other interests include multiplicity theory, local cohomology, and asymptotic properties of ideals. Back to Main page Jeff Lang Professor email: lang@math.ukans.edu My research interests are in commutative algebra and algebraic geometry. Much of my research has focused on the study of the geometry of Zariski Surfaces and certain questions concerning them posed by Oscar Zariski. I have also been intrigued by the classical Jacobian Problem. Back to Main page Graham Leuschke NSF Postdoctoral Fellow email: gleuschke@math.ukans.edu URL: www.math.ukans.edu/~gleuschke

75. Skidmore's Video Collection - Q Way of science 57 Q175 .W38 1995 First world 60 QA22 .F57 1990 Strange life and deathof Dr. Turing 50 QA29.T8 S77 1993 oscar zariski and his work QA29.Z37 http://www.skidmore.edu/library/videos/by_callno/Q.htm

Video Collection (by call number) (Shelved at Circulation Desk) Go to Title List A B C ... Z Title Running Time (minutes) Call Number Powers of ten Nazis and the Russian bomb : DNA detective molecular biologist Lydia Villa-Komaroff Q130 .D57 1995 pt.1 Earth explorer geophysicist Marcia McNutt Q130 .D57 1995 pt.2 High energy physicist Melissa Franklin Q130 .D57 1995 pt.3 Jewels in a test tube biochemist Lynda Jordan Q130 .D57 1995 pt.4 Silicon vision computational neuroscientist Misha Mahowald Q130 .D57 1995 pt.5 Secrets underground archaeologist Patty Jo Watson Q130 .D57 1995 pt.6 Age of intelligent machines : intelligence it's amazing Linus Pauling crusading scientist Glorious accident understanding our place in the cosmic puzzle Way of science ... Computer, what it can, and can't, do QA76.5 .C65 1984 guide Giant brains QA76.5 .M32 1992 vol.1 Inventing the future QA76.5 .M32 1992 vol.2 Paperback computer QA76.5 .M32 1992 vol.3 Thinking machine QA76.5 .M32 1992 vol.4 World at your fingertips QA76.5 .M32 1992 vol.5 Efficient algorithms in number theory Introducing Mathematica Similarity Similarity QA117 .S55 1990 guide Math a moving experience Math a moving experience QA135.5 .M37 1981 guide

76. TOPCOM, Letter To The Editor, John Isbell This has been hidden because it was oscar zariski who introduced Krull dimensioninto topology, and for his algebraic geometric purposes an over-simplified http://at.yorku.ca/t/o/p/c/53.htm

Topology Atlas Document # topc-53.htm Letter to the Editor Letter to the Editor from Volume 3, #1 , of TopCom Dear Editor, There is an important result in dimension theory that seems to be little known outside Spain: Krull dimension, if properly defined, in the same style as ind or dim , works very well for reasonable spaces. For instance, it agrees with ind and (therefore) with dim for separable metric spaces. This has been hidden because it was Oscar Zariski who introduced Krull dimension into topology, and for his algebraic- geometric purposes an over-simplified version of the definition works. The Zariski-Krull dimension is for all Hausdorff spaces. I got the Vinokurov reference from the paper of Petra Wiederhold and Richard G. Wilson in Ann. N. Y. Acad. Sci. 806 (1996) 444-453. They do not really use VGV (in their digital topology). I do not know of anyone who has used it. Vinokurov has been rather productive, but in probability theory. John Isbell SUNY at Buffalo Topology Atlas

77. Mathem_abbrev Xenocrates of Chalcedon Yates Frank Yau, ShingTung Yoccoz, Jean-Christophe Yunus,Abu'l-Hasan ibn Yushkevich, Adolph, zariski, oscar Zassenhaus, Hans Zeeman http://www.pbcc.cc.fl.us/faculty/domnitcj/mgf1107/mathrep1.htm

Mathematician Report Index Below is a list of mathematicians. You may choose from this list or report on a mathematician not listed here. In either case, you must discuss with me the mathematician you have chosen prior to starting your report. No two students may write a report on the same mathematician. I would advise you to go to the library before choosing your topic as there might not be much information on the mathematician you have chosen. Also, you should determine the topic early in the term so that you can "lock-in" your report topic!! The report must include: 1. The name of the mathematician. 2. The years the mathematician was alive. 3. A biography. 4. The mathematician's major contribution(s) to mathematics and an explanation of the importance. 5. A historical perspective during the time the mathematician was alive. Some suggestions on the historical perspective might be: (a) Any wars etc. (b) Scientific breakthroughs of the time (c) Major discoveries of the time (d) How did this mathematician change history etc.

78. Guradution Support The summary for this Chinese (Simplified) page contains characters that cannot be correctly displayed in this language/character set. http://www.icm2002.org.cn/Chinese/Wolf/Zariski.htm

ICM¼ò½é Àú½ìICM Zariski,Oscar ZariskiÖ÷ÒªÑо¿´úÊý¼¸ºÎѧ£®Ëûͨ¹ý½»»»´úÊýʹ´úÊý¼¸ºÎѧÏÖ´ú»¯£®1939Äê¶Ô´úÊýÇúæÆæµã½âÏû¸ø³ö´¿´úÊýÖ¤÷£¬1944ÄêÖ¤÷ÌØÕ÷Ϊ0µÄÓòÉÏÈýά´úÊý´ØµÄÆæµã¿É½âÏû£®1940ÄêÖ¤÷´úÊý´ØµÄ¾Ö²¿µ¥Öµ»¯µÄ´æÔÚ¶¨Àí£¬²¢µ¼ÖÂËûÒý½ø ZariskiÍØÆË£®Ëû»¹Òý½øÕý¹æ´Ø¼°Õý¹æ»¯¸ÅÄ²¢Ó¦ÓÓÚÏßÐÔϵ¼°´úÊý¶ÔÓ¦ÀíÂÛ£¬Ëû¸øÒâ´óÀûѧÅɵĴúÊýÇúæÀíÂÛ¸øÓèÑÏÜÂÛÊö£¬²¢·¢Õ¹¼«Ð¡Ä£ÐÍÀíÂÛ£®1964ÄêÆðËû¿ª´´Í¬ÆæÐÔÀíÂÛ¼°±¥ºÍÐÔÀíÂÛ.ÔçÆÚ¶Ô´úÊý¼¸ºÎÖеÄÍØÆËÎÊÌâÌرðÊÇ»ù±¾ÈºÒ²ÓкÜÖØÒªµÄ¹¤×÷. Zariski 1943Ä걻ѡΪÀ¹ú¹ú¼Ò¿ÆѧԺԺʿ£¬1965Äê±»ÊÚÓèÀ¹ú¹ú¼Ò¿Æѧ½±Õ£¬1981ÄêÒò¡°Í¨¹ýÓë½»»»´úÊýÈں϶øΪ´úÊý¼¸ºÎѧ´´ÔìÏÖ´ú·½·¨¡±¶ø»ñµWolf½±. Back home Please send your suggestions and comment to: icmsec@beijing.icm2002.org.cn Last modified: June 12, 2002

79. Alibris - Find Your Favorite Authors And Books At Alibris. oscar Yanes. oscar Ynsfran. oscar Yujnovsky. oscar Zambrano. oscar Zarate. oscarZariski. oscar Zeichner. oscar Zentner. oscar Zorrilla. oscar Zucchi. Osceola Ailor. http://www.alibris.com/authors/authors0263.html

Osaka Shiritsu Bijutsukan Osaka Shiritsu Chuo Toshokan Osaka Shiritsu Daigaku Osaka Shiritsu Eisei Shikenjo Osaka Shiritsu Bijutsukan Osaka Shiritsu Chuo Toshokan Osaka Shiritsu Daigaku Osaka Shiritsu Eisei Shikenjo ... Otto Recke

80. Compare Prices On Advanced Books - Comparison Shop Algebraic Ideas in Ergodic Theory. Author K. Schmidt. Algebraic Surfaces. AuthorOscar zariski. Almost Completely Decomposable Groups. Author A. Mader. http://osdn.pricegrabber.com/search_attrib_books.php/bkcat2=1253

ABOUT OSDN MY OSDN NEWSLETTERS SHOP ... ADVERTISE C O M P A R I S O N S H O P Prices Home Books Computers Electronics ... Books All Products Books Computers Electronics Software Video Games Books for Pictures On Pictures Off Advanced: Sorted by Title (Resort by: Popularity Results 1 - 25 of 294 Home Books Mathematics > Advanced Adjustment Computations Wiley Series in Surveying and Boundary Control Subtitle: Statistics and Least Squares in Surveying and GIS Author: Paul R. Wolf Charles D. Ghilani Advances in Queuing Subtitle: Edited by: Jewgeni H. Dshalalow Advances in the Mechanics and Physics of Surfaces Edited by: T. E. Fischer Advances in the Mechanics and Physics of Surfaces Author: T. E. Fischer Algebraic Surfaces Author: Oscar Zariski Almost Completely Decomposable Groups Author: A. Mader Applied Functional Analysis Pure and Applied Mathematics Subtitle: A Wiley-Interscience Series of Texts, Monographs and Tracts Author: Jean Pierre Aubin Applied Probability - Computer Science Subtitle: The Interface Author: Ralph L. Disney Teunis J. Ott Institute of Management Science, Applied Probability Technical Section-College of the Operations Research Society of America Applied Probability and Queues Author: Not Available Asymptotic Cones and Functions in Optimization and Variational Inequalities Author: A. Auslender

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